The radius of a sphere is measured as 4 centimeters, with a possible error of 0.025 centimeter. a. Use differentials to approximate the possible propagated error, in cm3, in computing the volume of the sphere. (b) Use differentials to approximate the possible propagated error, in cm2, in computing the surface area of the sphere. (c) Approximate the percent errors in parts (a) and (b). (Round your answers to two decimal places.) volume % surface area %
The radius of a sphere is measured as 4 centimeters, with a possible error of 0.025 centimeter. a. Use differentials to approximate the possible propagated error, in cm3, in computing the volume of the sphere. (b) Use differentials to approximate the possible propagated error, in cm2, in computing the surface area of the sphere. (c) Approximate the percent errors in parts (a) and (b). (Round your answers to two decimal places.) volume % surface area %
The radius of a sphere is measured as 4 centimeters, with a possible error of 0.025 centimeter. a. Use differentials to approximate the possible propagated error, in cm3, in computing the volume of the sphere. (b) Use differentials to approximate the possible propagated error, in cm2, in computing the surface area of the sphere. (c) Approximate the percent errors in parts (a) and (b). (Round your answers to two decimal places.) volume % surface area %
The radius of a sphere is measured as 4 centimeters, with a possible error of 0.025 centimeter.
a. Use differentials to approximate the possible propagated error, in cm3, in computing the volume of the sphere.
(b)
Use differentials to approximate the possible propagated error, in cm2, in computing the surface area of the sphere.
(c)
Approximate the percent errors in parts (a) and (b). (Round your answers to two decimal places.)
volume %
surface area %
With integration, one of the major concepts of calculus. Differentiation is the derivative or rate of change of a function with respect to the independent variable.
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